M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 1 M. Sc. in PHYSICS: FACULTY OF SCIENCE FIRST SEMESTER (ODD SEMESTER) Eligibility Criteria (Qualifying Exams) Admission Criteria Course Code Course Type Course (Paper/Subjects) Credits Contact Hours Per WeeK EoSE Duration (Hrs.) L T P Thy P Bachelor Degree in the concerned subject/ discipline 1) Merit List 2) Entrance Test (written or/and oral) if decided by the University 3) Observance of Reservation Policy. MSP 101 CCC Mathematical Physics 6 4 3 00 3 0 MSP 111 CCC General Experiments 6 00 00 9 0 3 MSP 102 CCC Classical Mechanics 6 4 3 00 3 0 MSP 103 CCC Quantum Mechanics I 6 4 3 00 3 0 MSP S01 OSC Research methodology &computer Application: basics 6 4 3 00 3 00 MSP A01 ECC/CB Constitutionalism &Indian Political System 6 4 3 00 3 00 MSP A02 ECC/CB Electronic Devices and Applications MSP A03 ECC/CB Condensed Matter Physics - I MSP A04 ECC/CB High Energy Physics - I TOTAL= 36 DEPARTMENT OF PHYSICS 2
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M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 1
M. Sc. in PHYSICS: FACULTY OF SCIENCE
FIRST SEMESTER (ODD SEMESTER)
Eligibility Criteria
(Qualifying
Exams)
Admission
Criteria
Course
Code Course Type Course (Paper/Subjects) Credits
Contact Hours Per
WeeK
EoSE
Duration
(Hrs.)
L T P Thy P
Bach
elor
Deg
ree
in t
he
con
cern
ed s
ub
ject
/ d
isci
pli
ne
1)
Mer
it L
ist
2)
Entr
ance
Tes
t (w
ritt
en o
r/an
d o
ral)
if
dec
ided
by t
he
Univ
ersi
ty
3)
Obse
rvan
ce o
f R
eser
vat
ion P
oli
cy.
MSP
101 CCC Mathematical Physics
6 4 3 00 3 0
MSP
111
CCC General Experiments
6 00 00 9 0 3
MSP
102
CCC Classical Mechanics
6 4 3 00 3 0
MSP
103
CCC Quantum Mechanics I
6 4 3 00 3 0
MSP
S01 OSC
Research methodology &computer
Application: basics 6 4 3 00 3 00
MSP
A01 ECC/CB
Constitutionalism &Indian Political
System
6 4 3 00 3 00
MSP
A02 ECC/CB Electronic Devices and Applications
MSP
A03 ECC/CB Condensed Matter Physics - I
MSP
A04 ECC/CB High Energy Physics - I
TOTAL= 36
DEPARTMENT OF PHYSICS2
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 2
M.Sc. in PHYSICS
( FIRST SEMESTER )
COURSE CODE: MSP 101 COURSE TYPE : CCC
COURSE TITLE: MATHEMATICAL PHYSICS
CREDIT: 06
THEORY: 06 PRACTICAL: 00
HOURS: 90
THEORY: 90 PRACTICAL: 00
MARKS: 100
THEORY: 70 CCA : 30 PRACTICAL: 00
OBJECTIVE: The main objective is to learn about Mathematical Physics .
UN
IT-1
15 H
rs.
Complex Variables
Analytic function - kinds of singularity - Line integrals and Cauchy’s theorem -
Taylor and Laurent expansions - Residue theorem - Application to evaluation of
definite integrals - conformal mapping and invariance of Laplacian in two
dimensions - Representation of functions by contour integral.
UN
IT-2
20 H
rs
Linear Differential equations and Green’s function
Second order linear differential equations - Liouville’s Theorem - Orthogonality of
eigenfunctions - Illustration with Legendre, Laguerre, Hermite and Chebyshev
differential equations - Location of Zeros of these polynomials - Wronskian,
ordinary and singular points - Green’s function- Eigenfunction expansion of
Green’s function - Reciprocity theorem - Liouville type equations in one dimension
and their Green’s function.
UN
IT-3
20 H
rs
Laplace and Fourier transforms
Laplace transforms - Solution of linear differential equations with constant
Coefficients - Fourier integral - Fourier transforms, Fourier sine and consine
transforms - Convolution theorems - Applications.
UN
IT-4
20H
rs
Tensor Analysis
Definition of scalars - contravariant Vectors and Covariant Vectors - Einstein’s
summation convention - Definition of tensors - Second rank cartesian tensor as
operator - Symmetric and antisymmetric tensors - tensors of rank higher than two
- Specific Tensors - Covariant derivatives.
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 3
UN
IT-
5
15H
rs
Group Theory
Definition of groups, subgroups and conjugate classes - Symmetry elements,
Transformation, Matrix representation - Point groups - representation of a group -
Reducible and irreducible representations - Orthogonality theorem - character of a
representation - character Table C2v and C3v - Application to Infrared and Raman
active vibrations of XY3 type molecules - Projection operators applied to an
equilateral triangle - Rotation group and angular momenta.
SU
GG
ES
TE
D
RE
AD
ING
S
1. Mathematical Methods for Physicists: George Arfken , Academic Press
2. Applied Mathematics for Engineers and Physicists: L. A. Pipe , McGraw Hill
3. Mathematical Methods - Potter and Goldberg , Prentice Hall of India
4. Elements of Group Theory for Physicists: A.W. Joshi, Wiley Eastern Ltd.
5. Vector Analysis (Schaum Series), McGraw Hill
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 4
M.Sc. in PHYSICS
( FIRST SEMESTER )
COURSE CODE: MSP 111 COURSE TYPE : CCC
COURSE TITLE: GENERAL EXPERIMENTS
CREDIT: 06
THEORY: 00 PRACTICAL: 06
HOURS: 135
THEORY: 00 PRACTICAL: 135
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 5
LA
BO
RA
TO
RY
WO
RK
M
SP
11
1
GENERAL EXPERIMENTS
1. Cornu’s method - Young’s modulus by elliptical fringes.
2. Cornu’s method - Young’s modulus by hyperbolic fringes.
3. Determination of Stefan’s constant.
4. Band gap energy - Thermister.
5. Hydrogen spectrum - Rydberg’s constant.
6. Co-efficient of linear expansion - Air wedge method.
7. Permittivity of a liquid using RFO.
8. Viscosity of liquid - Meyer’s disc.
9. Solar spectrum - Hartmann’s Interpolation formula
10. F.P. Etalon using spectrometer.
11. Iron / Copper arc spectrum.
12. Brass / Alloy arc spectrum.
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 6
M.Sc. in PHYSICS
( FIRST SEMESTER )
COURSE CODE: MSP 102COURSE TYPE : CCC
COURSE TITLE: CLASSICAL MECHANICS
CREDIT: 06
THEORY: 06 PRACTICAL: 00
HOURS: 90
THEORY: 90 PRACTICAL: 00
MARKS: 100
THEORY: 70 CCA : 30 PRACTICAL: 00
OBJECTIVE: The main objective is to learn about Classical Mechanics .
UN
IT-1
15H
ou
rs
Rigid body dynamics
Angular momentum, rotational kinetic energy and moment of inertia of a rigid body
- Euler’s angles - Euler’s equations of motion - Torque - free motion of a rigid body
- Motion of a symmetrical top under the action of gravity.
UN
IT-2
20H
ou
rs
Constraints : holonomic and non-holonomic constraints, D’Alembert's Principle
and Lagrange’s Equation, velocity dependent potentials, simple applications of
Lagrangian formulation. Hamilton Principle, Calculus of Variations, Derivation of
Lagrange’s equation from Hamilton’s principle. Extension of Hamilton's Principle
for non-conservative and nonholonomic systems, Method of Lagrange's
multipliers, Conservation theorems and Symmetry Properties, Noether's theorem.
Conservation of energy, linear momentum and angular momentum as a
consequence of homogeneity of time and space and isotropy of space.
UN
IT-3
20 H
ou
rs Generalized momentum, Legendre transformation and the Hamilton’s Equations
of Motion, simple applications of Hamiltonian formulation, cyclic coordinates,
Routh’s procedure, Hamiltonian Formulation of Relativistic Mechanics, Derivation
of Hamilton's canonical Equation from Hamilton's variational principle. The
principle of least action.
UN
IT-4
20H
rs
Canonical transformation, integral invariant of poincare: Lagrange's and Poisson
brackets as canonical invariants, equation of motion in Poisson bracket
formulation. Infinitesimal contact transformation and generators of symmetry,
Liouvilee's theorem, Hamilton-Jacobi equation and its application.
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 7
UN
IT-
5
15H
rs
Action angle variable adiabatic invariance of action variable: The Kepler problem
in action angle variables, theory of small oscillation in Lagrangian formulation,
normal coordinates and its applications.
SU
GG
ES
TE
D R
EA
DIN
GS
1. H. Goldstein, 2002, Classical Mechanics. 3rd Edition., C. Poole and J.Safko,
Non-relativistic Hamiltonian including spin - Addition of two angular momenta -
Clebsch - Gordan coefficients - Symmetry and anti symmetry of wave functions -
Pauli’s spin matrices.
SU
GG
ES
TE
D R
EA
DIN
GS
1. P.M. Mathews and K. Venkatesan, 1976, A Text book of Quantum Mechanics, Tata McGraw-Hill, New Delhi. 2. L.I. Schiff, 1968, Quantum Mechanics, 3rd Edition, International Student Edition, McGraw-Hill Kogakusha, Tokyo. 3. V. Devanathan, 2005, Quantum Mechanics, Narosa Publishing House, New Delhi. 4. E. Merzbacher, 1970, Quantum Mechanics 2nd Edition, John Wiley and Sons, New York. 5. V.K. Thankappan, 1985, Quantum Mechanics, 2nd Edition, Wiley Eastern Ltd, New Delhi. 6. P.A.M. Dirac, 1973, The Principles of Quantum Mechanics, Oxford University Press, London. 7. L.D. Landau and E.M. Lifshitz, 1976, Quantum Mechanics, Pergomon Press, Oxford. 8.Ashok Das and A.C. Melissions: Quantum Mechanics - A modern approach (Gordon and Breach Science Publishers).
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 10
M.Sc. in PHYSICS
( FIRST SEMESTER )
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 11
form. Ideals of the Indian Constitution incorporated in the Preamble.
Special Features of the Indian Constitution.
UN
IT -
2
24 H
rs
Unit-II:
Concept of State and Citizenship, Judicial Review and Fundamental Rights, Directive Principles
of the State Policy, Fundamental Duties, Procedure to Amend the Indian Constitution, Judiciary:
Supreme Court and High Court, Judicial Activism and Public Interest Litigation and Provisions
relating to Emergency.
UN
IT -
3
10
H r
s
Unit-III:
Union Executive- President, Prime Minister, Council of Ministers. State Executive- Governor,
Chief Minister and Council of Ministers. Local Bodies & Panchayati Raj
UN
IT -
4
24
Hrs
Unit-IV:
Parliament of India, State Legislatures, Legislative Bills: Ordinary, Money and Financial, Union
State Relations, Principles of the ‘Separation of Power and the ‘Principles of Check & Balance’.
Political Parties and Pressure Groups.
Challenges before Indian Democracy: Terrorism, Regionalism, Communalism, Linguistics and
National Integration.
UN
IT -
5
20 H
rs
Unit-V:
Controller & Accountant General of India, Solicitor General, Advocate General, Election
Commission, Union and State(s) Public Service Commission, Finance Commission.
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 14
SU
GG
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TE
D R
EA
DIN
GS
HOBBES, Thomas, The Leviathan, Chapters XIII & XVII [entry] LOCKE, John, The Second Treatise of Civil Government, Chapter IX [entry] ROUSSEAU, Jean-Jacques, The Social Contract or Principles of Political Right MONTESQUIEU, The spirit of the laws, RAZ, Joseph, “The rule of law and its virtue”, in The authority of law, Oxford University Press, 1979
Dicey on British constitution
P. Ishwara Bhat Inter-relationship between Fundamental Rights
M P Jain Indian Constitutional Law
H M Seervai Constitutional Law of India
V N Shukla Constitution of India
D DBasu Shorter Constitution of India
B Sivarao Constitutional Assembly Debates
J. V R Krishna Iyer Fundamental Rights and Directive Principles
Paras Diwan Human Rights and the Law
P K Tripathi Some Insight into Fundamental Rights
S P Sathe Fundamental Rights and Amendment to the Constitution
P B Gajendragadkar Law, Liberty and Social Justice David Karrys Politics of Law
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 15
M.Sc. in PHYSICS
( FIRST SEMESTER )
COURSE CODE: MSPA02COURSE TYPE : ECC/CB
COURSE TITLE: Electronic Devices and Applications
CREDIT: 06
THEORY: 06
HOURS: 90
THEORY: 90
MARKS: 100
THEORY: 70 CCA : 30
OBJECTIVE: The main objective is to learn aboutElectronic Devices and Applications
UN
IT-
1 2
0H
rs.
Fabrication of IC and logic families
Fabrication of IC - Monolithic integrated circuit fabrication - IC pressure
transducers - Monolithic RMS - Voltage measuring device - Monolithic voltage
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 17
SU
GG
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TE
D R
EA
DIN
GS
1. S.M. Sze, 1985, Semiconductor Devices - Physics and Technology, Wiley, New York. 2. Millman and Halkias, Integrated Electronics, McGraw-Hill, New Delhi. 3. R.A. Gaekwad, 1994, Op-Amps and intergrated circuits EEE. 4. Taub and Shilling, 1983, Digital Integrated Electronics, McGraw-Hill, New Delhi. 5. J. Millman, 1979, Digital and Analog Circuits and Systems, McGraw-Hill, London. 6. George Kenndy, 1987, Electronic communication systems 3rd Edition, McGraw-Hill, London.
7. R.F. Coughlin and F.F, Driscol, 1996, Op-Amp and linear integrated circuits, Prentice Hall of India, New Delhi. 8. M.S.Tyagi, Introduction to Semiconductor Devices, Wiley, New York. 9. P. Bhattacharya, 2002, Semiconductor Optoelectronic Devices, 2nd Edition, Prentice-Hall of India, New Delhi. 10. Deboo/ Burrous, 1985, Integrated circuits and semiconductor Devices - Theory and application, McGraw-Hill, New Delhi. 11. D. Roy Choudhury, 1991, Linear integrated circuits, Wiley Eastern, New Delhi. 12. Ramakant Gaekwad, 1981, Operational amplifiers, Wiley Eastern, New Delhi.
M.Sc.(PHYSICS)/SYLLABUS(CBCS)/SEMESTER – I Page 18
M.Sc. in PHYSICS
( FIRST SEMESTER )
COURSE CODE: MSPA03COURSE TYPE : ECC/CB
COURSE TITLE: CONDENSED MATTER PHYSICS - I
CREDIT: 06
THEORY: 06
HOURS : 90
THEORY: 90
MARKS : 100
THEORY: 70 CCA : 30
OBJECTIVE: The main objective is to learn aboutCondensed Matter Physics .
UN
IT-
1 2
0H
rs.
Phase transformation and alloys: Equilibrium transformation of first and second
order, equilibrium diagrams, phase rule, interpretation of phase diagrams,